Isosceles right triangle

Calculate the area of an isosceles right triangle whose perimeter is 377 cm.

Result

S =  6096.4 cm2

Solution:

p=2a+b sinγ/2=b/2a b=2asinγ/2=2asin45 p=2a+b=2a+2asin45=2a(1+sin45)  a=p2(1+sin45)=110.421  S=12a2=12110.4212=6096.4 cm2 p = 2a+b \ \\ \sin \gamma/2 = \dfrac{b/2}{ a } \ \\ b = 2a \sin \gamma/2 = 2a \sin 45^\circ \ \\ p = 2a + b = 2a + 2a \sin 45^\circ = 2a(1+\sin 45^\circ ) \ \\ \ \\ a = \dfrac{ p }{ 2 \cdot (1+\sin 45^\circ ) } = 110.421 \ \\ \ \\ S = \dfrac{1}{2} a^2 = \dfrac{1}{2} 110.421^2 = 6096.4 \ cm^2 \ \\

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Pythagorean theorem is the base for the right triangle calculator. See also our trigonometric triangle calculator.

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